System discovery and signaling

ABSTRACT

An extensible communication system is described herein. The system includes a first module for receiving a root index value and for generating a constant amplitude zero auto-correlation sequence based on the root value. The system further includes a second module for receiving a seed value and for generating a Pseudo-Noise sequence based on the seed value. The system further includes a third module for modulating the constant amplitude zero auto-correlation sequence by the Pseudo-Noise sequence and for generating a complex sequence. The system further includes a fourth module for translating the complex sequence to a time domain sequence, wherein the fourth module applies a cyclic shift to the time domain sequence to obtain a shifted time domain sequence.

CROSS-REFERENCE TO RELATED APPLICATIONS

This application is a divisional of U.S. Pat. Application No. 17/236,206 filed on Apr. 21, 2021, now pending, which is a continuation of U.S. Pat. Application No. 16/219,054 filed on Dec. 13, 2018, now U.S. Pat. No. 11,012,282, which is a continuation of U.S. Pat. Application No. 15/648,978 filed on Jul. 13, 2017, now U.S. Pat. No. 10,158,518, which is a continuation of U.S. Pat. Application No. 15/065,427 filed on Mar. 9, 2016, now U.S. Pat. No. 10,079,708, which claims priority from U.S. Provisional Pat. Application No. 62/130,365 filed on Mar. 09, 2015, now expired, all of which are incorporated by reference herein in their entirety.

FIELD OF DISCLOSURE

The present disclosure relates to the field of wireless communication, and more particularly, to a mechanism for enabling robust signal detection and service discovery in broadcast networks.

BACKGROUND

The broadcast spectrum is divided up into different frequencies and allocated among different broadcasters for various uses in different geographic regions. The frequencies of the spectrum are allocated based on licenses granted to the broadcasters. Based on the allocations, a broadcaster may be limited to broadcasting a specific type of content, such a television signal, on a certain frequency within a certain geographic radius. Broadcasting outside of an allocated spectrum could be a violation for the broadcaster.

If a broadcaster wishes to transmit another type of content within that geographic radius, the broadcaster may be required to obtain an additional spectrum license and in turn be allocated an additional frequency within that frequency. Similarly, if a broadcaster wishes to transmit content within another geographic radius, the broadcaster may be required to obtain an additional spectrum license for that region. Obtaining additional spectrum licenses, however, may be difficult, time consuming, expensive, and impractical.

In addition, a broadcaster may not always fully utilize an entire portion of spectrum for which it has been granted a license. This may create inefficiencies in the utilization of the broadcast spectrum.

Moreover, the anticipated use of the broadcast spectrum may be changing. For example, current broadcast television solutions are monolithic and designed for a primary singular service. However, broadcasters may anticipate providing multiple wireless-based types of content, in addition to broadcast television in the future, including mobile broadcasting and IoT services. In particular, there are many scenarios where a large number of devices may all wish to receive identical data from a common source beyond broadcast television. One such example is mobile communication services, where a large number of mobile communication devices in various geographic locations may all need to receive a common broadcast signal conveying the same content, such as a software update or an emergency alert, for example. In such scenarios, it is significantly more efficient to broadcast or multicast the data to such devices rather than individually signaling the same data to each device. Thus, a hybrid solution may be desirable.

To more efficiently utilize the broadcast spectrum, different types of content may be time-multiplexed together within a single RF channel. Further, different sets of transmitted content may need to be transmitted with different encoding and transmission parameters, either simultaneously, in a time division-multiplexed fashion (TDM), in a frequency division - multiplexed (FDM), layer division-multiplexed (LDM) or a combination. The amount of content to be transmitted may vary with time and/or frequency.

In addition, content with different quality levels (e.g. high definition video, standard definition video, etc.) may need to be transmitted to different groups of devices with different propagation channel characteristics and different receiving environments. In other scenarios, it may be desirable to transmit device-specific data to a particular device, and the parameters used to encode and transmit that data may depend upon the device’s location and/or propagation channel conditions.

At the same time, the demand for high-speed wireless data continues to increase, and it is desirable to make the most efficient use possible of the available wireless resources (such as a certain portion of the wireless spectrum) on a potentially time-varying basis.

SUMMARY

An example extensible communication system is described herein. The system includes a first module for receiving a root index value and for generating a constant amplitude zero auto-correlation sequence based on the root value. The system further includes a second module for receiving a seed value and for generating a Pseudo-Noise sequence based on the seed value. The system further includes a third module for modulating the constant amplitude zero auto-correlation sequence by the Pseudo-Noise sequence and for generating a complex sequence. The system further includes a fourth module for translating the complex sequence to a time domain sequence, wherein the fourth module applies a cyclic shift to the time domain sequence to obtain a shifted time domain sequence.

An example extensible communication method is described herein. The method comprises the step of receiving a root index value and generating a constant amplitude zero auto-correlation sequence based on the root value. The method further comprises the step of receiving a seed value and generating a Pseudo-Noise sequence based on the seed value. The method further comprises the step of modulating the constant amplitude zero auto-correlation sequence by the Pseudo-Noise sequence and generating a complex sequence. The method further comprises the step of translating the complex sequence to a time domain sequence and applying a cyclic shift to the time domain sequence to obtain a shifted time domain sequence.

BRIEF DESCRIPTION OF THE DRAWINGS

In the accompanying drawings, structures are illustrated that, together with the detailed description provided below, describe exemplary embodiments of the claimed invention. Like elements are identified with the same reference numerals. It should be understood that elements shown as a single component may be replaced with multiple components, and elements shown as multiple components may be replaced with a single component. The drawings are not to scale and the proportion of certain elements may be exaggerated for the purpose of illustration.

FIG. 1 illustrates an example broadcast network.

FIG. 2 illustrates an example system for originating bootstrap symbols.

FIG. 3 illustrates a complex I/Q constellation of ZC+PN.

FIGS. 4A-4B, respectively, illustrate example frame control compositions.

FIG. 5 illustrates example field termination signaling.

FIG. 6 illustrates an example signal waveform illustrated in FIG. 1 .

FIG. 7 illustrates an example system for originating bootstrap symbols.

FIG. 8 illustrates an example PN sequence generator.

FIG. 9 is an example illustration of the mapping of frequency domain sequence to subcarriers.

FIGS. 10A-10B illustrate example time domain structures.

FIG. 11 illustrates an example for originating bootstrap symbols.

DETAILED DESCRIPTION

Described herein is a robust and extensible signaling framework, and, in particular, a bootstrap signal designed to enable robust detection and service discovery, system synchronization, and receiver configuration. The bootstrap provides two primary functions: synchronization and the signaling to discover the waveform being emitted via low level signaling to start decoding a waveform that follows. It is a robust waveform that provides extensibility to evolve over time. In particular, the bootstrap signal works for current broadcasting system but also allows for support of new services, including mobile broadcasting and IoT services.

A robust signaling system enables a signal to be discovered in high noise, low ‘carrier to noise ratio’ (CNR), and high Doppler environments. It should be appreciated that it is possible that only the bootstrap signal may be robust, while the actual waveform following bootstrap may not be as robust. Having a robust bootstrap signal allows synchronization by receivers to achieve and maintain a lock to the signal they are picking up in less than ideal environments. When noise conditions worsen and the receiver can no longer discern the payload from noise, it may still remain locked to the channel through the bootstrap. When noise conditions improve, the receiver does not need to go through the entire re-acquisition process since it already knows where to find the channel.

With an extensible signaling system, many different waveforms can be signaled, one for each of the types of services that is going to be transmitted in the future. Thus, new waveforms that don’t exist today that may need to be used can also be signaled through the bootstrap.

It should be appreciated that the following acronyms and abbreviations may be used herein:

BSR Baseband Sampling Rate BW Bandwidth CAZAC Constant Amplitude Zero Auto-Correlation DC Direct Current EAS Emergency Alert System FFT Fast Fourier Transform IEEE Institute of Electrical & Electronic Engineers IFFT Inverse Fast Fourier Transform kHz kilohertz LDM Layer Division Multiplexing LFSR Linear Feedback Shift Register MHz Megahertz ms millisecond PN Pseudo-Noise µs microsecond ZC Zadoff-Chu

FIG. 1 illustrates an example broadcast network communication system 100 including a plurality of content providers 102A, 102B, and 102C (hereinafter content provider 102) providing a variety of types of content 104A, 104B, and 104C (hereinafter content 104) via a broadcast network 106. It should be appreciated that although three content providers 102 are illustrated, system 100 may include any suitable number of content providers 102. In addition, content providers 102 may be providers of any suitable types of content, such as televisions broadcast signals, software updates, emergency alerts, and so on. It should be further appreciated that the content providers 102 may provide content 104 via either a wireless or wired connection to a gateway 108.

The content 104 is time-multiplexed, at the gateway 108, into a single RF channel 110. The broadcast receivers 112A, 112B, and 112C (hereinafter broadcast receiver 112) are configured to identify and receive the broadcast signals 114 via the RF channel 110. It should be appreciated that although three different types of broadcast receivers 112 are illustrated (a laptop computer 112A, a mobile telephone 112B, and a television 112C), system 100 may include any suitable number and type of broadcast receivers 112.

A bootstrap (not shown) indicates, at a low level, the type or form of a signal 114 that is being transmitted during a particular time period, so that the broadcast receiver 112 can discover and identify the signal 114, which in to indicates how to receive the services that are available via that signal 114. Thus, the bootstrap is relied on as an integral part of every transmit frame to allow for sync/detection and system configuration. As will be described, the bootstrap design includes a flexible signaling approach to convey frame configuration and content control information to the broadcast receiver 112. The signal design describes the mechanism by which signal parameters are modulated on the physical medium. The signaling protocol describes the specific encoding used to communicate parameter selections governing the transmit frame configuration. This enables reliable service discovery while providing extensibility to accommodate evolving signaling needs from a common frame structure. Specifically, the design of the bootstrap enables universal signal discovery independent of channel bandwidth.

The bootstrap also enables reliable detection in the presence of a variety of channel impairments such as time dispersion and multipath fading, Doppler shift, and carrier frequency offset. In addition, multiple service contexts are accessible based on mode detection during signal discovery enabling broad flexibility in system configuration. The bootstrap also facilitates extensibility to accommodate ongoing evolution in service capability based on a hierarchical signaling structure. Thus, new signal types not yet conceived, could be provided by a content provider 102 and identified within a transmitted signal 114 through the use of a bootstrap signal. Moreover, reusable bit-fields interpreted based on the detected service mode/type enable bit-efficient signaling despite the level of extensibility afforded. In one example, the bootstrap is configured to be a robust signal and detectable even at low signal levels. As a result, individual signaling bits within the bootstrap may be comparatively expensive in terms of physical resources that they occupy for transmission. Thus, the bootstrap may be intended to signal only the minimum amount of information required for system discovery and for initial decoding of the following signal.

General Bootstrap Overview

Described herein is a bootstrap, independent of an implementation example to be described later. As will be described further, ATSC 3.0 is one example implementation of the bootstrap capability and sets certain constraints to general bootstrap capability. An appreciation of these general concepts in bootstrap construction will help those skilled in art see the wide applicability of this technology in future communications systems of various bandwidths and frequency bands in RF spectrum.

FIG. 2 illustrates an example system 200 for generating a bootstrap. The bootstrap signal 202 generated by the system 200 consists of (N) OFDM symbols labeled (0-N). The frequency occupation, or bandwidth, is smaller than the post bootstrap signal 206, or waveform, by design. The post bootstrap signal 204 represents service being signaled by bootstrap and consumed by a receiver. The post bootstrap signal 204 can be any waveform enabling future flexibility and extensibility as will be discussed.

Described herein is the bootstrap signal. The baseband sampling rate (BSR) is denoted by the following equation:

$\begin{matrix} {\text{BSR = Fs =}\left( \text{N + 16} \right)\text{X}\left( \text{M} \right)\text{or Time domain: T}_{\text{s}} = {1/\text{F}_{\text{s}}}} & \text{­­­Equ (1)} \end{matrix}$

where F_(s)is the Frequency Sampling, N is the Operational Variable to scale over bandwidth chosen, and M is Factor (MHz) to Choose Bandwidth.

The OFDM subcarrier spacing (in Hz) is defined as:

$\begin{matrix} {\Delta\text{F =}{\text{F}_{\text{s}}/\text{FFT}}_{(\text{Size})}} & \text{­­­Equ (2)} \end{matrix}$

Where the FTT size is some power of 2 (e.g. 1024, 2048, 4096, 8192....).

In one example (ATSC 3.0) design process for the 6 MHz broadcast television bandwidth in USA, the equation, M = 0.384 is chosen because of an existing relationship to LTE (based on WCDMA). Other relationships may be chosen. Thus, in this one example:

$\begin{matrix} \begin{array}{l} {\text{F}_{\text{s}} = \left( {0 + 16} \right)\text{X}\left( {.384\text{MHz}} \right) = 6.144\text{MHz;}} \\ {\text{F}_{\text{s}} = 6.144\text{MHz, FFT}_{(\text{Size})} = 2048;\text{and}} \end{array} & \text{­­­Equ (3)} \end{matrix}$

ΔF = 6.144MHz/2048= 3000Hz

A Zadoff Chu sequence length N_((ZC))is then selected (based on a prime number) to be mapped over a portion of the FFT_((Size))to support the bandwidth chosen. Thus,

$\begin{matrix} {\text{Bandwidth =}\Delta\text{F X}\left( {\text{N}_{(\text{ZC})} + 1} \right);} & \text{­­­Equ (4)} \end{matrix}$

wherein the N_(ZC) is mapped to center of FFT (1500 sub-carriers including DC) and zero padding is used on remaining sub-carriers. In the ATSC 3.0 example, N_((ZC))= 1499 was chosen. Thus,

Bandwidth = 3000(Hz)x(1499 + 1) = 4.5MHz

As a result, in the example ATSC 3.0 implementation described, the design consumes a 4.5 MHz bandwidth and has ΔF=3000 Hz which will give adequate Doppler performance (MPH) for broadcast band in mobile environment.

It should be appreciated other selections for parameters in the above general equations could enable wider bandwidths or frequency bands (Doppler), etc. In particular, although the value (N) is specified in ATSC 3.0 as 0, the full range of (0-127) is available for N. In the example illustrated, N is constrained to N=0 to achieve 6 MHz. However, it should be appreciated that, by substituting N=127, a bandwidth greater than 50 MHz can be supported. This is illustrative of the extensibility of the bootstrap.

Referring again to FIG. 2 , the system further includes a Zadoff-Chu module or sequence generator 206 and a pseudo noise (PN) module or sequence generator 208. A Zadoff-Chu (ZC) sequence, is a complex-valued mathematical sequence which, when applied to radio signals results in a couple interesting properties one of which is that of constant amplitude signal. It can be defined as:

$\begin{matrix} \text{ZC Sequence=e}^{- \text{j}\text{π}\text{q}{\lbrack{\text{k}{{(\text{k+1})}/\text{N}}_{(\text{ZC})}}\rbrack}} & \text{­­­Equ (5)} \end{matrix}$

FIG. 3 illustrates the complex I/Q constellation 300 of ZC+PN in which each I/Q value resides on the unit circle 302 and is described as a phase around this unit circle 302, wherein the amplitude is constant.

It should be appreciated that another theoretical property of (ZC) is that different cyclically shifted versions of root sequence can be imposed on a signal and can result in ideal zero autocorrelation. A generated Zadoff-Chu sequence that has not been shifted is known as a “Root Sequence.” Referring again to FIG. 2 , symbol#0, which is used primarily for synchronization and versioning, has not been shifted. However, it should be appreciated that the theoretic zero autocorrelation by using a (ZC) alone isn’t achieved over a large range of cyclic shifts.

As a result of this basic design requirement, the need of a large number of cyclic shifts with theoretic ideal autocorrelation was foreseen, something not natural to (ZC) alone. Then, through simulation and experiments, it was discovered and developed that by introducing a Pseudo-Noise (PN) sequence, in addition to ZC, all cyclic shifts can be enabled to approach near theoretic ideal autocorrelation.

FIG. 4B shows results of simulation of just a ZC alone and resulting non-ideal autocorrelation while FIG. 4A is results of simulation of a ZC+PN and resulting near ideal autocorrelation is shown. In particular, the PN-sequence phase-rotates individual complex subcarriers retaining the desirable Constant Amplitude Zero Autocorrelation Waveform (“CAZAC”) properties of the original ZC-sequence, illustrated in FIG. 3 . The added phase rotation is intended to provide greater signal separation between cyclic shifts of the same root sequence suppressing spurious auto-correlation responses observed using a ZC-sequence without the addition of PN-sequence modulation, illustrated in FIG. 4B. Thus, as can be appreciated, the discovery of (ZC+PN) drastically improves the signaling robustness and the capacity (number bits per symbol) communicated by mechanism of cyclic shifts.

Referring again to FIG. 2 , the first symbol #0 is a Root with no cyclic shift while Symbols 1-N carrying signaling via mechanism of cyclic shifts. Also, it is seen that mapping and zero padding is applied, by a mapping module 210, to Symbol #0. The symbols (1-N) have PN added to ZC that results in reflective symmetry as shown and will be discussed later by example.

The signal is then sent to an IFFT module 212 and converted from frequency domain to the time domain. The signal then is processed in time domain. The signal exiting IFFT is termed “A” which then has pre-fix and post-fix sections derived from “A” known as “B” and “C”. The symbol #0 has a time sequence “CAB” while all other symbols have a time sequence of “BCA”. It should be appreciated that the purpose of this is to add robustness and discriminate symbol #0 which is used for synchronization and versioning.

The length of bootstrap symbols is defined by:

$\begin{matrix} {\text{T}_{\text{Symbol}} = \left\lbrack \text{C + A + B} \right\rbrack\text{x T}_{\text{s}}} & \text{­­­Equ (6)} \end{matrix}$

In one example (ATSC 3.0), the symbol length is 500 µs.

To enable capability to extend the number of symbols, a mechanism of inversion of (ZC) on the last symbol in bootstrap sequence is used, as illustrated in FIG. 5 . In particular, field termination is signaled by a 180° phase inversion in the final symbol period relative to the preceding symbol period. Thus, instead of needing to specify in advance how long a single is going to be in order for the receiver to be able to identify the end of a signal, the receiver is instead able to look for an inverted symbol in the signal which would indicate the end of the signal. This allows for the bootstrap to be flexible and extensible since advance knowledge of how long a signal is going to be isn’t necessary. Thus, instead of defining a bootstrap length in advance, and either wasting extra space or not reserving enough space (in which case it may not be possible to completely transmit the intended information), the length of the bootstrap is flexible in that it can be discovered. Moreover, an inverted signal may be relatively easy to detect and therefore not require significant additional resources to implement.

It should be appreciated that the receiver will gracefully ignore a Major version (Root) that it doesn’t understand. This ensures extensibility without disrupting legacy receivers in future. In fact, one such signaling method is provided by ATSC 3.0 to be discussed later and is illustrated by Table 2 herein.

FIG. 6 illustrates an example signal waveform 114 illustrated in FIG. 1 . The signal waveform 114 includes a bootstrap 602 followed by a post-bootstrap waveform 604 or the remainder of the waveform. The bootstrap 602 provides a universal entry point into the signal waveform 114. It employs a fixed configuration (e.g. sampling rate, signal bandwidth, subcarrier spacing, time domain structure) known to all broadcast receivers 112.

It should be appreciated that having a flexible or variable sampling defined in the bootstrap offers flexibility previously unavailable. In particular, rather than designing a solution for a specific service having a fixed or defined sampling rate as a function of bandwidth, a flexible sampling rate enable scaling for a variety of different bandwidths in order to accommodate diverse services with different requirements and constraints. Thus, the same system for synchronization and discovery can be used for a large range of bandwidths and can serve a large band, since different sections of a band may be better suited for different types of services.

The bootstrap 602 may consist of a number of symbols. For example, the bootstrap 202 may begin with a synchronization symbol 606 positioned at the start of each waveform to enable service discovery, coarse synchronization, frequency offset estimation, and initial channel estimation. The remainder 608 of the bootstrap 602 may contain sufficient control signaling to permit the reception and decoding of the remainder of the signal waveform 114 to begin.

The bootstrap 602 is configured to exhibit flexibility, scalability, and extensibility. For example, the bootstrap 602 may implement versioning for increased flexibility. Specifically, bootstrap 602 design may enable a major version number (corresponding to a particular service type or mode) and a minor version (within a particular major version). In one example, the versioning may be signaled (as will be described) via appropriate selection of a Zadoff-Chu root (major version) a Pseudo-Noise sequence seed (minor version) used for generating the base encoding sequence for bootstrap symbol contents. The decoding of signaling fields within the bootstrap 602 can be performed with regard to the detected service version, enabling hierarchical signaling where each assigned bit-field is reusable and is configured based on the indicated service version. The syntax and semantics of signaling fields within the bootstrap 612 may be specified, for example, within standards to which the major and minor version refers.

In order to further exhibit scalability and extensibility, the number of bits signaled per bootstrap 602 symbol can be defined, up to a maximum, for a particular major/minor version. The maximum number of bits per symbol defined by the equation:

$\begin{matrix} \left( {N_{bps} = \left\lfloor {log_{2}\left( {N_{FFT}/{CyclicShiftTol}} \right)} \right\rfloor} \right) & \text{­­­Equ (7)} \end{matrix}$

where is dependent on the desired cyclic shift tolerance which in turn is dependent on expected channel deployment scenarios and environments. If available, additional new signaling bits can be added to existing symbols in a backward compatible manner without requiring a change to the service version.

As a result, the bootstrap 602 signal duration is extensible in whole symbol periods, with each new symbol carrying up to N_(bps)additional signaling bits. Bootstrap 602 signal capacity may thus be dynamically increased until field termination is reached.

FIG. 7 illustrates an example system 700 for originating bootstrap 602 symbols. As described, the values used for each bootstrap 602 symbol originate in the frequency domain with a Zadoff-Chu (ZC) sequence 704 modulated by a Pseudo-Noise (PN) cover sequence 702 with a sequence generator 708. The ZC-root 704 and PN-seed 702 determine the service’s major and minor versions, respectively. The resulting complex sequence is applied per subcarrier at the Inverse Fast Fourier Transform (“IFFT”) input 706. The system 700 further includes a sub-carrier mapping module 710 for mapping output of the sequence generator 708 to the IFFT input 706. The PN sequence 702 introduces a phase rotation to individual complex subcarriers retaining the desirable Constant Amplitude Zero Auto-Correlation (CAZAC) properties of the original ZC sequence 704. The PN sequence 702 further suppresses spurious emissions in the autocorrelation response, thereby providing additional signal separation between cyclic shifts of the same root sequence.

It should be further appreciated that modulating a ZC sequence with a pseudo-noise sequence in particular, gives the waveform different characteristics that makes it easily discoverable. In particular, modulating with a PN sequence results in near ideal correlation with less uncertainty. Such a combination was discovered through simulation after testing many combinations of algorithms and sequences. In particular, modulating a ZC sequence with a PN sequence produced the unexpected result of producing a signal that is easy to correlate to with no spurious signals created during correlation. This leads to a signal which is easily discoverable, meaning a receiver may correlate with the signal even in high noise settings.

Bootstrap - Implementation (ATSC 3.0 Example)

Described herein is an example implementation of the example bootstrap 602. It should be appreciated that although the examples described herein may refer to a specific implementation of as bootstrap, it is contemplated that the bootstrap 602 will have broader applications beyond the example illustrated below.

Bootstrap Specification - Dimensions

In one example, the bootstrap 602 structure is intended to remain fixed even as version numbers and/or the other information signaled by the bootstrap 602 evolves. In one example, the bootstrap 602 uses a fixed sampling rate of 6.144 Msamples/second and a fixed bandwidth of 4.5 MHz, regardless of the channel bandwidth used for the remainder of the waveform 604. The time length of each sample is also fixed by the sampling rate. Thus,

$\begin{matrix} \begin{array}{l} {f_{\text{s}} = 6.144{\text{Ms}/\text{sec}}} \\ {T_{\text{s}} = {1/f_{\text{s}}}} \\ {BW_{\text{Bootstrap}} = 4.5\text{MHz}} \end{array} & \text{­­­Equ (8)} \end{matrix}$

An FFT size of 2048 results in a subcarrier spacing of 3 kHz.

$\begin{matrix} \begin{array}{l} {N_{FFT} = \text{2048}} \\ {f\text{Δ} = fs/N_{FFT} = 3\text{kHz}} \end{array} & \text{­­­Equ (9)} \end{matrix}$

In this example, each bootstrap 602 symbol has a time duration of ~333.33 µs. When processed in time domain to be discussed later using (CAB or BCA) the exact length of T_(symbol) is 500 µs. The overall time duration of the bootstrap 602 depends on the number of bootstrap 602 symbols, which is specified as N_(s). A fixed number of bootstrap 602 symbols shall not be assumed.

$\begin{matrix} {T_{\text{symbol}} = 500\text{μ}\text{s}} & \text{­­­Equ (10)} \end{matrix}$

It should be appreciated that a 4.5 MHz bandwidth may be selected based on current industry consensus, which also covers 5 MHz as a lowest bandwidth in common use and smaller than 6 MHz broadcast in this example. Thus, the baseband sampling rate can be calculated using:

$\begin{matrix} {\left( \text{N + 16} \right)\text{X 0}\text{.384 MHz = 6}\text{.144}{\text{MS}/\text{sec}}.\left( \text{N = 0 bootstrap} \right)} & \text{­­­Equ (11)} \end{matrix}$

Selecting a 2048 FFT length, which has good gain, results in a Δf of 3 KHz which gives good Doppler performance. It should be appreciated that a similar system can be implemented for other sections of the band. For example, variation of the same formula, in which the formula and N value would be optimized for that specific bandwidth could be used for other bandwidths such as 20 MHz.

It should be appreciated that basing the BSR formula on a 0.384 MHz factor, which is related to LTE systems (and a relationship to WCDMA), a new system may be able to work off of oscillator(s) used for other implementations. In addition, all 3GPP LTE baseband sampling rates for all current bandwidths described in standards today can also be calculated from the formula by inserting value (N). Thus, adopting the formula allows for future versions of equipment that contain some sort variation of LTE variation to still work. However, it should be appreciated that the BSR formula may similarly be based on other suitable factors.

It should be further appreciated that although examples described herein utilize a selected FFT size of 2048, other suitable FFT sizes may similarly be used. A receiver must first synchronize and identify an incoming signal so that it can begin decoding its information. A longer signaling sequence however, such as an FFT size of 2048, has a higher gain and is therefore easier to discover since the amount of information the receiver has available to find, or correlate to, is larger.

In existing cellular communication, the gain may not be a factor since communication occurs in a unicast nature and primary synchronization signal (PSS) is frequently inserted for random access by multiple users. Moreover, broadcasters may not have been concerned about gain in the past since broadcast may have been generally intended for static receivers that were on high grounds. However, when broadcasting to mobile device or to locations with poor reception, higher gain may become more important. A mobile device, however, may not have an optimal antenna shape to rely on for gain and may not be ideally positioned for best reception and therefore mathematical gain may be relied on.

Therefore, longer signal lengths, such as the example FFT = 2048, provides longer sequences to correlate to and therefore results in more robust reception. For example, with a longer signal, the bootstrap may be discoverable in underground locations, below the noise floor. In addition, longer signal lengths also enable more unique sequences. For example, each transmitter can be assigned unique sequence and receivers can then search for sequences independently. This information can be used, by Global Positioning System (GPS) systems for example, to calculate a position of the receiver using TDOA techniques, is not discussed herein.

It should be appreciated that, although other suitable signal lengths may be chosen, a signal length of 2048 has been identified herein in order to optimize performance. In particular, choosing a different signal length may result in tradeoffs between different parameters, including the amount of gain which could impact performance.

Bootstrap Specification - Frequency Domain Sequence

In one example, the Zadoff-Chu (ZC) sequence has length N_(ZC)= 1499, where this is the largest prime number that results in a channel bandwidth no greater than 4.5 MHz with a subcarrier spacing of f_(Δ)= 3 kHz. The ZC sequence is parameterized by a root q, which corresponds to a major version number:

$\begin{matrix} {z_{q}(k) = e^{- j\pi q\frac{k{({k + 1})}}{N_{ZC}}}} & \text{­­­Equ (12)} \end{matrix}$

where

q ∈ {1, 2, …, N_(ZC) − 1}

and

k = 0, 1, 2,…,N_(ZC) − 1.

The use of a pseudo-noise sequence to modulate the ZC sequence has allowed for the relaxation of constrains on the ZC root. While previous signaling methods that utilized ZC (e.g. LTE Primary Synchronization Sequence) were limited to selecting prime roots to assure good autocorrelation properties, in this system, the PN modulation allows for good autocorrelation even when non-prime roots are selected for ZC. Having non-prime roots for ZC allows for the creation of more waveforms, allowing the system to signal more types of services, i.e. creating a more extensible system.

FIG. 8 illustrates an example PN sequence generator 708. The PN sequence generator 808 is derived from a Linear Feedback Shift Register (LFSR) 802 of length (order) l = 16. Its operation is governed by a generator polynomial 804 specifying the taps in the LFSR feedback path followed by a mask 806 specifying the elements that contribute to the sequence output 808. Specification of the generator polynomial 804 and initial state of the registers represents a seed, which corresponds to a minor version number. That is, a seed is defined as f(g, r_(tnit)).

The PN sequence generator registers 802 are re-initialized with the initial state from the seed prior to the generation of the first symbol in a new bootstrap 602. The PN sequence generator 708 continues to sequence from one symbol to the next within a bootstrap 602 and is not re-initialized for successive symbols within the same bootstrap 602.

The output of the PN sequence generator 708 is defined as p(k) which will have a value of either 0 or 1. p(0) shall be equal to the PN sequence generator output after the PN sequence generator 708 has been initialized with the appropriate seed value and before any clocking of the shift register 802. A new output p(k) shall subsequently be generated every time the shift register 802 is clocked on position to the right. Thus, in one example, the generator polynomial 804 for the PN sequence generator 708 shall be defined as:

$\begin{matrix} {\text{g =}\left\{ {\text{g1,}\ldots\text{,g0}} \right\} = \left\{ {1,1,1,0,0,0,0,0,0,0,0,0,0,0,0,1,1} \right\}} & \text{­­­Equ (13)} \end{matrix}$

where

p(x) = x¹⁶ + x¹⁵ + x¹⁴ + x + 1

FIG. 9 is an example illustration of the mapping 900 of frequency domain sequence to subcarriers. The ZC-sequence value that maps to the DC subcarrier (i.e. z_(q)((N_(ZC) - 1)/2)) is zeroed so that the DC subcarrier is null. The subcarrier indices are illustrated with the central DC subcarrier having index 0.

The product of the ZC and the PN sequences has reflective symmetry about the DC subcarrier. The ZC sequence has a natural reflective symmetry about the DC subcarrier. A reflective symmetry of the PN sequence about the DC subcarrier is introduced by mirror-reflecting the PN sequence values assigned to subcarriers below the DC subcarrier to the subcarriers above the DC subcarrier. For example, as illustrated the PN sequence values at subcarriers -1 and + 1 are identical, as are the PN sequence values at subcarriers -2 and +2. As a result, the product of the ZC and PN sequences also has reflective symmetry about the DC subcarrier.

It should be appreciated that the symmetry described herein enables a more robust signal, making it easier to discover. In particular, the symmetry acts as an additional aid for discovery (i.e. additional gain). This is an additional feature of the signal that the receiver can look for, making it easier to find. Thus, it is one of the elements that allows the bootstrap to be recognized even below the noise floor.

As the mapping 900 illustrates, the subcarrier values for the n-th symbol of the bootstrap (0 ≤ n < N_(s)) may be expressed as:

$\begin{matrix} {s_{n}(k) = \left\{ \begin{array}{l} {z_{q}\left( {k + N_{H}} \right) \times c\left( {\left( {n + 1} \right) \times N_{H} + k} \right) - N_{H} \leq k \leq - 1} \\ {z_{q}\left( {k + N_{H}} \right) \times c\left( {\left( {n + 1} \right) \times N_{H} + k} \right)1 \leq k \leq N_{H}} \\ \begin{array}{llllllll} 0 & & & & & & & \text{otherwise} \end{array} \end{array} \right\}} & \text{­­­Equ (14)} \end{matrix}$

where

N_(H) = (N_(ZC) − 1)/2

and

c(k) = 1-2 x p(k)

with c(k) having either the value +1 or -1. It should be appreciated that the ZC sequence is the same for each symbol, while the PN sequence advances with each symbol.

In one example, the final symbol in the bootstrap is indicated by a phase inversion (i.e. a rotation of 180°) of the subcarrier values for that particular symbol. This bootstrap termination signaling enables extensibility by allowing the number of symbols in the bootstrap to be increased for additional signaling capacity in a backwards compatible manner without requiring the major or minor version numbers to be changed. The phase inversion simply involves multiplying each subcarrier value by e^(jπ)= -1

$\begin{matrix} {{\widetilde{s}}_{n}(k) = \left\{ \begin{array}{ll} {s_{n}(k)} & {0 \leq n \leq N_{s} - 1} \\ {- s_{n}(k)} & {n = N_{s} - 1} \end{array} \right)} & \text{­­­Equ (15)} \end{matrix}$

This phase inversion enables receivers to correctly determine the end point of the bootstrap. For example, a receiver may determine the endpoint of a bootstrap for a minor version that is later than the minor version for which the receiver was designed and that has been extended by one or more bootstrap symbols. As a result, receivers do not need to assume a fixed number of bootstrap symbols. In addition, receivers may ignore the signaling bit contents of a bootstrap symbol that the receiver has not been provisioned to decode but still detect the presence of the bootstrap symbol itself.

Once mapped, the frequency domain sequence is then translated to the time domain via a N_(FFT)= 2048 point IFFT:

$\begin{matrix} {{\widetilde{A}}_{n}(t) = {\sum\limits_{k = - {{({N_{ZC} - 1})}/2}}^{- 1}{{\widetilde{s}}_{n}(k)e^{j2\pi f\Delta T_{S}t} +}}{\sum\limits_{k = 1}^{{({N_{ZC} - 1})}/2}{{\widetilde{s}}_{n}(k)e^{j2\pi f\Delta T_{S}t}}}} & \text{­­­Equ (16)} \end{matrix}$

Bootstrap Specification - Symbol Signaling

Information is signaled via the bootstrap symbols through the use of cyclic shifts in the time domain of the A_(n)(t) time domain sequence. This sequence has a length of N_(FFT) = 2048 and thus 2048 distinct cyclic shifts are possible (from 0 to 2047, inclusive). With 2048 possible cyclic shifts, up to log₂(2048) = 11 log₂(2048) = 11bits can be signaled. It should be appreciate that not all of these bits will actually be used. In particular,

N_(b)^(n)

represents the number of signaling bits that are used for the n-th bootstrap symbol (1≤ n <N_(s)), and

b_(o)^(n), …,

b_(N_(b)^(n) − 1)^(n)

represent the values of those bits.

The number of active signaling bits in a received bootstrap symbol may be greater than the number of signaling bits

N_(b)^(n)

expected by a receiver. To facilitate future signaling expansion while maintaining backwards compatibility, a receiver shall not assume that the number of active signaling bits in a received bootstrap symbol is no greater than the number of signaling bits

N_(b)^(n)

expected by that receiver. For example,

N_(b)^(n)

for one or more specific bootstrap symbols may be increased when defining a new minor version within the same major version in order to make use of previously unused signaling bits while still maintaining backward compatibility. Thus, a receiver provisioned to decode the signaling bits for a particular major/minor version may ignore any new additional signaling bits that may be used in a later minor version within the same major version.

It should be appreciated that, in the examples described herein, the distance between correlation peaks between a symbol’s bootstrap in the time domain is what encodes signaling information. In particular, the symbolic is the reference point (absolute shift) and the distance between that and the subsequent peaks (relative to the first one) carries information. The meaning of that distance can be determined from a defined lookup table, for example. Thus, the receiver is not trying to decode bits but is instead trying to identify correlation peaks. Once the receiver finds a peak, it waits for the next one, and the time between those holds signaling information. This creates a more robust system since time difference between peaks is easier to discover in high noise conditions, even though using 256 cyclic shifts, for example, to represent 8 bits of binary information may be relatively expensive. Actual signaling for the payload following the bootstrap, however, may still include a modulation scheme with actual bits that carry information.

In one example, a cyclic shift is represented as M _(n)(0 ≤ M _(n)< N_(FFT)) for the nth bootstrap symbol (1 ≤ n < N_(s)) relative to the cyclic shift for the previous bootstrap symbol. M _(n)is calculated from the signaling bit values for the n-th bootstrap symbol using a Gray code method. M _(n)is represented in binary form as a set of bits

m₁₀^(n)m₉^(n)…m₁^(n)m₀^(n).

Each bit of M _(n)be computed as follows:

$\begin{matrix} {m_{i}^{n} = \left\{ \begin{array}{ll} {\left( {\sum\limits_{k = 0}^{10 - i}b_{k}^{n}} \right){mod}2} & {i > 10 - N_{b}^{n}} \\ 1 & {i = 10 - N_{b}^{n}} \\ 0 & {i < 10 - N_{b}^{n}} \end{array} \right)} & \text{­­­Equ (17)} \end{matrix}$

where the summation of the signaling bits followed by the modulo operation effectively performs a logical exclusive OR operation on the signaling bits in question.

This equation ensures that the relative cyclic shift M _(n)is calculated to provide the maximum tolerance to any errors at the receiver when estimating the relative cyclic shift for a received bootstrap symbol. If the number of valid signaling bits

N_(b)^(n)

for a specific bootstrap symbol is increased in a future minor version within the same major version, the equation also ensures that the relative cyclic shifts for that future minor version bootstrap symbol will be calculated in such a manner that will still allow a receiver provisioned for an earlier minor version to correctly decode the signaling bit values that it is provisioned to decode, and hence backward compatibility will be maintained.

It should be appreciated that in general, the expected robustness of signaling bit bp will be greater than that of

b_(k)^(n)ifi < k.

In one example, the first bootstrap symbol is used for initial time synchronization and signals the major and minor version numbers via the ZC-root and PN-seed parameters. This symbol does not signal any additional information and hence always has a cyclic shift of 0.

The differentially-encoded absolute cyclic shift, M_(n)(0 ≤ M_(n)< N_(FFT)), applied to the nth bootstrap symbol is calculated by summing the absolute cyclic shift for bootstrap symbol n-1 and the relative cyclic shift for bootstrap symbol n, modulo the length of the time domain sequence:

$\begin{matrix} {M_{n} = \left\{ \begin{matrix} 0 & {n = 0} \\ {\left( {M_{n - 1} + {\widetilde{M}}_{n}} \right)modN_{FFT}} & {1 \leq n < N_{S}} \end{matrix} \right)} & \text{­­­Equ (18)} \end{matrix}$

The absolute cyclic shift is then applied to obtain the shifted time domain sequence from the output of the IFFT operation:

$\begin{matrix} {A_{\text{n}}\left( \text{t} \right) = {\widetilde{A}}_{\text{n}}\left( {\left( {t + M_{n}} \right){mod}N_{FFT}} \right)} & \text{­­­Equ (19)} \end{matrix}$

Bootstrap Specification - Time Domain Structure

Each bootstrap symbol is composed of three parts: A, B, and C, where each of these parts consists of a sequence of complex-valued time domain samples. Part A is derived as the IFFT of the frequency domain structure with an appropriate cyclic shift applied, while B and C are composed of samples taken from A with a frequency shift of ±f_(Δ)(equal to the subcarrier spacing) and a possible phase shift of e^(-jπ) introduced to the frequency domain sequences axed for calculating the samples of part B. Parts A, B, and C include N_(A)= N_(FFT)= 2048, N_(B)= 504, and Nc = 520 samples, respectively. Each bootstrap symbol consequently contains N_(A)+ N_(B)+ Nc = 3072 samples for an equivalent time length of 500 µs.

In one example, a time domain structure includes two variants: CAB and BCA. The initial symbol of the bootstrap (i.e. bootstrap symbol 0), provided for sync detection, employs the C-A-B variant. The remaining bootstrap symbols (i.e. bootstrap symbol n where 1 ≤ n < N_(s)) conforms to the B-C-A variant up to and including the bootstrap symbol that indicates field termination.

It should be appreciated that repeating a portion of the bootstrap allows for improved initial synchronization and discovery since the receiver knows to expect this repetition in a particular order and there makes the signal easier to discover and lock onto, even in high noise conditions.

FIG. 10A illustrates an example CAB structure 1010. In this example, part C 1012 is composed of the last N_(B)=504 samples of part A 1014 with a frequency shift of +f_(Δ) and a phase shift of e^(-jπ)applied to the originating frequency domain sequence S_(n)(k) used for calculating part A 1014. The samples for part B 1016 can be taken as the negation of the last N_(B)samples of a cyclically shifted time domain sequence calculated, where the input frequency domain sequence is equal to S_(n)(k) shifted one subcarrier position higher in frequency (i.e. S_(n)(k) = S_(n)((k - 1 + N_(FFT)) mod N_(FFT)), with S_(n)(k) being the input frequency domain sequence for generating the frequency-and-phase shifted samples for part B 1016). Alternatively, the frequency and phase shifts for generating the part B 1016 samples can be introduced in the time domain by multiplying the appropriately extracted samples from part A 1014 by e^(j2πf)Δ^(t) as shown in equation:

$\begin{matrix} {S_{CAB}^{n}(t) = \left\{ \begin{array}{ll} {A_{n}\left( {t + 1528T_{S}} \right)} & \left( {0 \leq t < 520T_{S}} \right) \\ {A_{n}\left( {t - 520T_{S}} \right)} & {520T_{S} \leq t < 2568T_{S}} \\ {A_{n}\left( {t - 1024T_{S}} \right)e^{j2\pi f_{\Delta}t}} & {2568T_{S} \leq t < 3072T_{S}} \\ 0 & {otherwise} \end{array} \right)} & \text{­­­Equ (20)} \end{matrix}$

FIG. 10B illustrates an example BCA structure 1020. In this example, part C 1012 is again composed of the last N_(C) = 520 samples of A 1014, but B 1016 is composed of the first N_(B)=504 samples of C 1012 with a frequency shift of -f_(Δ)applied to the originating frequency domain sequences S_(n)(k) used for calculating part A 1014. In a similar fashion to that described with respect to example CAB structure 1010, samples for part B 1016, can be taken as the last N_(B)samples of a cyclically shifted time domain sequence calculated, where the input frequency domain sequence is equal to S_(n)(k) shifted one subcarrier position lower in frequency (i.e. S_(n)(k) = S_(n)((k-1) mod N_(FFT)), with S_(n)(k) being the input frequency domain sequence for generating the frequency-shifted samples for part B 1016). The frequency shift for generating the part B 1016 samples can alternatively be introduced in the time domain by multiplying the appropriate samples from part A 1014 by e-^(j2πf)Δ^(t), with a constant time offset of -520T, being included to account for the correct extraction of the appropriate samples part A 1014, as illustrated in the equation:

$\begin{matrix} {S_{BCA}^{n}(t) = \left\{ \begin{array}{ll} {A_{n}\left( {t + 1528T_{S}} \right)e^{- j2\pi f_{\text{Δ}}{({t - 520})}}} & \left( {0 \leq t < 504T_{S}} \right) \\ {A_{n}\left( {t - 1024T_{S}} \right)} & {504T_{S} \leq t < 1024T_{S}} \\ {A_{n}\left( {t - 1024T_{S}} \right)} & {1024T_{S} \leq t < 3072T_{S}} \\ 0 & {otherwise} \end{array} \right)} & \text{­­­Equ (21)} \end{matrix}$

It should be appreciated that the samples for part B 1016 may be taken from slightly different sections of part A 1014 for each of the CAB structure 1010 and the BCA structure 1020.

Bootstrap Signal Structure

An example bootstrap signal structure is described herein. A signaling set or structure includes configuration parameter values, a list of control information fields, and an assignment of those values and fields to specific signaling bits. It should be appreciated that a bootstrap signal structure may take other suitable forms, different than the example described herein.

The example bootstrap signal structure described herein may apply when a major version number is equal to 0. The corresponding ZC sequence root (q) is 137. The base number of symbols (including the initial synchronization symbol) in the bootstrap shall be N_(s) = 4. It should be appreciated that N_(s) = 4 represents the minimum number of symbols that can be transmitted. Thus, to enable the transmission of additional signaling bits, N_(s)= 4 represents the minimum number of symbols (but not necessarily the maximum) that shall be transmitted within a bootstrap signal.

In one example, the generator polynomial for the Pseudo-Noise sequence generator is defined as:

$\begin{matrix} \begin{array}{l} {g = \left\{ {g_{1},\ldots,g_{0}} \right\} = \left\{ {1,1,1,0,0,0,0,0,0,0,0,0,0,0,0,1,1} \right\} =} \\ {\left\lbrack \begin{array}{lllll} 16 & 15 & 14 & 1 & 0 \end{array} \right\rbrack\mspace{6mu}} \\ {p(x) = x^{16} + x^{15} + x^{14} + x + 1} \end{array} & \text{­­­Equ (22)} \end{matrix}$

and the initial register state for the Pseudo-Noise sequence generator is defined as:

$\begin{matrix} {r_{init} = \left\{ {r_{\text{t-1}},\ldots,r_{0}} \right\} = \left\{ {0,0,\ldots,0,1} \right\}} & \text{­­­Equ (23)} \end{matrix}$

In one example, the initial register state of the PN sequence generator for a selected bootstrap minor version within a given major version is set to a value from a predefined list of values in order to signal the corresponding minor version that is in use. Table 1 illustrates example initial register states of a PN sequence generator for respective minor versions.

TABLE 1 Initial Register State of PN Sequence Generator r_(init)= (r_(t-1), ..., r₀) Bootstrap Minor Version Binary Hexadecimal 0 0000 0001 1001 1101 0×019D 1 0000 0000 1110 1101 0×00ED 2 0000 0001 1110 1000 0×01E8 3 0000 0000 1110 1000 0×00E8 4 0000 0000 1111 1011 0×00FB 5 0000 0000 0010 0001 0×0021 6 0000 0000 0101 0100 0×0054 7 0000 0000 1110 1100 0×00EC

The bootstrap signal structure may include additional signaling fields following the major and minor version signals. For example, the signal structure may include a wake up bit. This can be an emergency alert wake up bit, for example. This is a 1 bit field that is either on (1) or off (0).

The signal structure may further include a Minimum Time Interval to Next Frame of Same Major and Minor Version field. This is defined as the time period measured from the start of the bootstrap for frame A to the earliest possible occurrence of the start of the bootstrap for frame B. Bootstrap B is guaranteed to lie within the time window beginning at the signaled minimum time interval value ending at the next-higher minimum time interval value that could have been signaled. If the highest-possible minimum time interval value is signaled, then this time window is unterminated. An example signal mapping formulas can be defined as:

$\begin{matrix} {T = \left\{ \begin{array}{ll} {T = 50\mspace{6mu} \times \mspace{6mu}\text{X} + 50} & \left( {0 \leq X < 8} \right) \\ {T = 100\mspace{6mu} \times \mspace{6mu}\left( {X - 8} \right) + 500} & \left( {8 \leq X < 16} \right) \\ {T = 200\mspace{6mu} \times \mspace{6mu}\left( {X - 16} \right) + 1300} & \left( {16 \leq X < 24} \right) \\ {T = 400\mspace{6mu} \times \mspace{6mu}\left( {X - 24} \right) + 2900} & \left( {24 \leq X < 32} \right) \end{array} \right)} & \text{­­­Equ (24)} \end{matrix}$

Thus, an example signaled value of X=10 would indicate that bootstrap B lies somewhere in a time window that begins 700 ms from the start of bootstrap A and ends 800 ms from the start of bootstrap A.

The quantity is signaled via a sliding scale with increasing granularities as the signaled minimum time interval value increases. X represents the 5-bit value that is signaled and T represents the minimum time interval in milliseconds to the next frame that matches the same version number as the current frame. Table 2 illustrates example values.

TABLE 2 Example Minimum Time Interval To Next Frame Index Bit Value Minimum Time Interval (ms) 0 00000 50 1 00001 100 2 00010 150 3 00011 200 4 00100 250 5 00101 300 6 00110 350 7 00111 400 8 01000 500 9 01001 600 10 01010 700 11 01011 800 12 01100 900 13 01101 1000 14 01110 1100 15 01111 1200 16 10000 1300 17 10001 1500 18 10010 1700 19 10011 1900 20 10100 2100 21 10101 2300 22 10110 2500 23 10111 2700 24 11000 2900 25 11001 3300 26 11010 3700 27 11011 4100 28 11100 4500 29 11101 4900 30 11110 5300 31 11111 5700

The signal structure may further include a System Bandwidth field. This field signals the system bandwidth used for the post-bootstrap portion of the current frame. Values include 00=6 MHz, 01=7 MHz, 10=8 MHz, 11=Greater than 8 MHz. It should be appreciated that the “greater than 8 MHz” option facilitates future operation using a system bandwidth greater than 8 MHz. Receivers that are not provisioned to handle a system bandwidth greater than 8 MHz could ignore frames where this field is equal to 11.

Table 3 illustrates bootstrap signaling fields are mapped to specific signaling bits and bootstrap symbols, in one example. The most significant to least significant bits of each signaling field are mapped to the specified signaling bits in the given order from left to right. It should be appreciated that

b_(i)^(n)

refers to the ith signaling bit of the nth bootstrap symbol, and that bootstrap symbol 0 does not carry any specific signaling bits.

TABLE 3 Example Bootstrap Signaling Bit Mappings Field Name # Bits Signaling Bit Mapping (MSB to LSB) Major System Version Number 0 n/a Minor System Version Number 0 n/a Minimum Time Interval to Next Frame of Same Major and Minor Version 5 b₃¹b₄¹b₅¹b₆¹b₇¹ EAS Wake Up 1 b₀¹ System Bandwidth 2 b₁¹b₂¹ BSR_COEFFICIENT 7 b₀²b₁²b₂²b₃²b₄²b₅²b₆² Preamble Structure Indicator 6 b₀³b₁³b₂³b₃³b₄³b₅³ Number of LDM layers 1 b₆³

FIG. 11 illustrates an example extensible communication method. At step 1102, a first module receives a root index value and generates a constant amplitude zero auto-correlation sequence based on the root value. At step 1104 a second module receives a seed value and generates a Pseudo-Noise sequence based on the seed value. At step 1106 a third module modulates the constant amplitude zero auto-correlation sequence by the Pseudo-Noise sequence and generates a complex sequence. At step 1108 a fourth module translates the complex sequence to a time domain sequence and applies a cyclic shift to the time domain sequence to obtain a shifted time domain sequence.

Any of the various embodiments described herein may be realized in any of various forms, e.g., as a computer-implemented method, as a computer-readable memory medium, as a computer system, etc. A system may be realized by one or more custom-designed hardware devices such as Application Specific Integrated Circuits (ASICs), by one or more programmable hardware elements such as Field Programmable Gate Arrays (FPGAs), by one or more processors executing stored program instructions, or by any combination of the foregoing.

In some embodiments, a non-transitory computer-readable memory medium may be configured so that it stores program instructions and/or data, where the program instructions, if executed by a computer system, cause the computer system to perform a method, e.g., any of the method embodiments described herein, or, any combination of the method embodiments described herein, or, any subset of any of the method embodiments described herein, or, any combination of such subsets.

In some embodiments, a computer system may be configured to include a processor (or a set of processors) and a memory medium, where the memory medium stores program instructions, where the processor is configured to read and execute the program instructions from the memory medium, where the program instructions are executable to implement any of the various method embodiments described herein (or, any combination of the method embodiments described herein, or, any subset of any of the method embodiments described herein, or, any combination of such subsets). The computer system may be realized in any of various forms. For example, the computer system may be a personal computer (in any of its various realizations), a workstation, a computer on a card, an application-specific computer in a box, a server computer, a client computer, a hand-held device, a mobile device, a wearable computer, a sensing device, a television, a video acquisition device, a computer embedded in a living organism, etc. The computer system may include one or more display devices. Any of the various computational results disclosed herein may be displayed via a display device or otherwise presented as output via a user interface device.

To the extent that the term “includes” or “including” is used in the specification or the claims, it is intended to be inclusive in a manner similar to the term “comprising” as that term is interpreted when employed as a transitional word in a claim. Furthermore, to the extent that the term “or” is employed (e.g., A or B) it is intended to mean “A or B or both.” When the applicants intend to indicate “only A or B but not both” then the term “only A or B but not both” will be employed. Thus, use of the term “or” herein is the inclusive, and not the exclusive use. See, Bryan A. Garner, A Dictionary of Modem Legal Usage 624 (2d. Ed. 1995). Also, to the extent that the terms “in” or “into” are used in the specification or the claims, it is intended to additionally mean “on” or “onto.” Furthermore, to the extent the term “connect” is used in the specification or claims, it is intended to mean not only “directly connected to,” but also “indirectly connected to” such as connected through another component or components.

While the present application has been illustrated by the description of embodiments thereof, and while the embodiments have been described in considerable detail, it is not the intention of the applicants to restrict or in any way limit the scope of the appended claims to such detail. Additional advantages and modifications will readily appear to those skilled in the art. Therefore, the application, in its broader aspects, is not limited to the specific details, the representative apparatus and method, and illustrative examples shown and described. Accordingly, departures may be made from such details without departing from the spirit or scope of the applicants general inventive concept. 

What is claimed is:
 1. A receiver device, comprising: a memory configured to store program instructions; and a processor, upon executing the program instructions, configured to: receive a bootstrap signal comprising a first bootstrap symbol and a second bootstrap symbol; determine a first correlation peak associated with the first bootstrap symbol; determine a second correlation peak associated with the second bootstrap symbol; determine a time difference between the first correlation peak and the second correlation peak; and determine signaling information based on the time difference.
 2. The receiver device of claim 1, wherein the processor, upon executing the program instructions, is configured to determine the signaling information using a lookup table.
 3. The receiver device of claim 1, wherein the processor, upon executing the program instructions, is configured to determine the first correlation peak associated with the first bootstrap symbol having no cyclic shift.
 4. The receiver device of claim 1, wherein to receive the bootstrap signal, the processor, upon executing the program instructions, is configured to receive the bootstrap signal further comprising a third bootstrap symbol and a fourth bootstrap symbol, wherein the fourth bootstrap symbol has a 180 degrees phase inversion relative to the third bootstrap symbol.
 5. The receiver device of claim 1, wherein the processor, upon executing the program instructions, is configured to: receive a waveform following the bootstrap signal; and use the signaling information for decoding the waveform.
 6. The receiver device of claim 1, wherein the processor, upon executing the program instructions, is configured to determine a major version number and a minor version number from the first bootstrap symbol.
 7. The receiver device of claim 1, wherein the processor, upon executing the program instructions, is configured to use the first bootstrap signal for initial time synchronization.
 8. A method, comprising: receiving, by a receiver device, a bootstrap signal comprising a first bootstrap symbol and a second bootstrap symbol; determining, by the receiver device, a first correlation peak associated with the first bootstrap symbol; determining, by the receiver device, a second correlation peak associated with the second bootstrap symbol; determining, by the receiver device, a time difference between the first correlation peak and the second correlation peak; and determining, by the receiver device, signaling information based on the time difference.
 9. The method of claim 8, further comprising: determining, by the receiver device, the signaling information using a lookup table.
 10. The method of claim 8, further comprising: determining, by the receiver device, the first correlation peak associated with the first bootstrap symbol having no cyclic shift.
 11. The method of claim 8, wherein the receiving the bootstrap signal comprises receiving the bootstrap signal further comprising a third bootstrap symbol and a fourth bootstrap symbol, wherein the fourth bootstrap symbol has a 180 degrees phase inversion relative to the third bootstrap symbol.
 12. The method of claim 8, further comprising: receiving, by the receiver device, a waveform following the bootstrap signal; and using, by the receiver device, the signaling information for decoding the waveform.
 13. The method of claim 8, further comprising: determining, by the receiver device, a major version number and a minor version number from the first bootstrap symbol.
 14. The method of claim 8, further comprising: using, by the receiver device, the first bootstrap signal for initial time synchronization.
 15. A non-transitory computer-readable medium storing instructions that, when executed by a processor, cause the processor to perform operations, the operations comprising: receiving a bootstrap signal comprising a first bootstrap symbol and a second bootstrap symbol; determining a first correlation peak associated with the first bootstrap symbol; determining a second correlation peak associated with the second bootstrap symbol; determining a time difference between the first correlation peak and the second correlation peak; and determining signaling information based on the time difference.
 16. The non-transitory computer-readable medium of claim 15, wherein the operations further comprising: determining the signaling information using a lookup table.
 17. The non-transitory computer-readable medium of claim 15, wherein the operations further comprising: determining the first correlation peak associated with the first bootstrap symbol having no cyclic shift.
 18. The non-transitory computer-readable medium of claim 15, wherein the receiving the bootstrap signal comprises receiving the bootstrap signal further comprising a third bootstrap symbol and a fourth bootstrap symbol, wherein the fourth bootstrap symbol has a 180 degrees phase inversion relative to the third bootstrap symbol.
 19. The non-transitory computer-readable medium of claim 15, wherein the operations further comprising: receiving a waveform following the bootstrap signal; and using the signaling information for decoding the waveform.
 20. The non-transitory computer-readable medium of claim 15, wherein the operations further comprising: determining a major version number and a minor version number from the first bootstrap symbol; and using the first bootstrap signal for initial time synchronization. 